/* Data is in the following format
   Note, if the class group has not been computed, it, the class number, the fundamental units, regulator and whether grh was assumed are all 0.
[polynomial,
degree,
t-number of Galois group,
signature [r,s],
discriminant,
list of ramifying primes,
integral basis as polynomials in a,
1 if it is a cm field otherwise 0,
class number,
class group structure,
1 if grh was assumed and 0 if not,
fundamental units,
regulator,
list of subfields each as a pair [polynomial, number of subfields isomorphic to one defined by this polynomial]
]
*/

[x^18 - 4*x^17 + 10*x^16 - 21*x^15 + 37*x^14 - 58*x^13 + 80*x^12 - 97*x^11 + 107*x^10 - 106*x^9 + 92*x^8 - 71*x^7 + 52*x^6 - 39*x^5 + 30*x^4 - 20*x^3 + 11*x^2 - 4*x + 1, 18, 286, [0, 9], -9291932134821949543, [7, 1399], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, a^12, a^13, a^14, a^15, a^16, 1/841*a^17 - 92/841*a^16 - 304/841*a^15 - 181/841*a^14 - 14/841*a^13 + 333/841*a^12 + 211/841*a^11 - 163/841*a^10 + 154/841*a^9 - 202/841*a^8 + 207/841*a^7 + 215/841*a^6 - 366/841*a^5 + 211/841*a^4 - 36/841*a^3 - 216/841*a^2 - 324/841*a - 86/841], 0, 1, [], 0, [ (1762)/(841)*a^(17) - (6519)/(841)*a^(16) + (14366)/(841)*a^(15) - (28777)/(841)*a^(14) + (48499)/(841)*a^(13) - (71757)/(841)*a^(12) + (94252)/(841)*a^(11) - (106391)/(841)*a^(10) + (111558)/(841)*a^(9) - (105306)/(841)*a^(8) + (81317)/(841)*a^(7) - (57649)/(841)*a^(6) + (44728)/(841)*a^(5) - (35262)/(841)*a^(4) + (25714)/(841)*a^(3) - (14757)/(841)*a^(2) + (6038)/(841)*a - (1834)/(841) , (1816)/(841)*a^(17) - (7282)/(841)*a^(16) + (16452)/(841)*a^(15) - (33505)/(841)*a^(14) + (57835)/(841)*a^(13) - (86574)/(841)*a^(12) + (116579)/(841)*a^(11) - (134536)/(841)*a^(10) + (143422)/(841)*a^(9) - (138921)/(841)*a^(8) + (110997)/(841)*a^(7) - (81361)/(841)*a^(6) + (61968)/(841)*a^(5) - (46575)/(841)*a^(4) + (34703)/(841)*a^(3) - (22216)/(841)*a^(2) + (9567)/(841)*a - (3955)/(841) , (2529)/(841)*a^(17) - (8121)/(841)*a^(16) + (16678)/(841)*a^(15) - (32203)/(841)*a^(14) + (51217)/(841)*a^(13) - (72851)/(841)*a^(12) + (89571)/(841)*a^(11) - (93488)/(841)*a^(10) + (92593)/(841)*a^(9) - (79425)/(841)*a^(8) + (50861)/(841)*a^(7) - (29827)/(841)*a^(6) + (25557)/(841)*a^(5) - (22282)/(841)*a^(4) + (14081)/(841)*a^(3) - (2978)/(841)*a^(2) - (1103)/(841)*a + (2007)/(841) , (2836)/(841)*a^(17) - (11135)/(841)*a^(16) + (25952)/(841)*a^(15) - (52448)/(841)*a^(14) + (89810)/(841)*a^(13) - (135456)/(841)*a^(12) + (180419)/(841)*a^(11) - (208286)/(841)*a^(10) + (219766)/(841)*a^(9) - (209560)/(841)*a^(8) + (168234)/(841)*a^(7) - (119407)/(841)*a^(6) + (88123)/(841)*a^(5) - (69358)/(841)*a^(4) + (54330)/(841)*a^(3) - (32286)/(841)*a^(2) + (12964)/(841)*a - (3370)/(841) , (1591)/(841)*a^(17) - (4243)/(841)*a^(16) + (8321)/(841)*a^(15) - (15487)/(841)*a^(14) + (22299)/(841)*a^(13) - (30303)/(841)*a^(12) + (32941)/(841)*a^(11) - (28899)/(841)*a^(10) + (24672)/(841)*a^(9) - (13576)/(841)*a^(8) - (335)/(841)*a^(7) + (5665)/(841)*a^(6) - (3698)/(841)*a^(5) - (699)/(841)*a^(4) + (753)/(841)*a^(3) + (5359)/(841)*a^(2) - (4997)/(841)*a + (3621)/(841) , (2762)/(841)*a^(17) - (9373)/(841)*a^(16) + (20695)/(841)*a^(15) - (40736)/(841)*a^(14) + (66457)/(841)*a^(13) - (97864)/(841)*a^(12) + (124437)/(841)*a^(11) - (136513)/(841)*a^(10) + (139408)/(841)*a^(9) - (124809)/(841)*a^(8) + (91523)/(841)*a^(7) - (59627)/(841)*a^(6) + (43722)/(841)*a^(5) - (37876)/(841)*a^(4) + (29241)/(841)*a^(3) - (11256)/(841)*a^(2) + (2459)/(841)*a + (1312)/(841) , (1596)/(841)*a^(17) - (2180)/(841)*a^(16) + (914)/(841)*a^(15) + (428)/(841)*a^(14) - (8888)/(841)*a^(13) + (20981)/(841)*a^(12) - (41694)/(841)*a^(11) + (66160)/(841)*a^(10) - (78842)/(841)*a^(9) + (91380)/(841)*a^(8) - (95174)/(841)*a^(7) + (74020)/(841)*a^(6) - (46737)/(841)*a^(5) + (33996)/(841)*a^(4) - (28862)/(841)*a^(3) + (26986)/(841)*a^(2) - (14186)/(841)*a + (5714)/(841) , (1919)/(841)*a^(17) - (8348)/(841)*a^(16) + (20462)/(841)*a^(15) - (42056)/(841)*a^(14) + (74054)/(841)*a^(13) - (113668)/(841)*a^(12) + (155132)/(841)*a^(11) - (184124)/(841)*a^(10) + (197129)/(841)*a^(9) - (192526)/(841)*a^(8) + (160071)/(841)*a^(7) - (116404)/(841)*a^(6) + (83981)/(841)*a^(5) - (63528)/(841)*a^(4) + (50338)/(841)*a^(3) - (32690)/(841)*a^(2) + (14040)/(841)*a - (3562)/(841) ], 509.337225135, [[x^2 - x + 2, 1], [x^3 - x^2 - 2*x + 1, 1], [x^6 - x^5 + x^4 - x^3 + x^2 - x + 1, 1], [x^9 - 2*x^8 + 3*x^7 - x^6 - 2*x^5 + 5*x^4 - 4*x^3 + 2*x - 1, 1]]]